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355 lines
13 KiB
C++
355 lines
13 KiB
C++
/*************************************************************************************
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Grid physics library, www.github.com/paboyle/Grid
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Source file: ./lib/algorithms/iterative/LocalCoherenceLanczos.h
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Copyright (C) 2015
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Author: Christoph Lehner <clehner@bnl.gov>
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Author: paboyle <paboyle@ph.ed.ac.uk>
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This program is free software; you can redistribute it and/or modify
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it under the terms of the GNU General Public License as published by
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the Free Software Foundation; either version 2 of the License, or
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(at your option) any later version.
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This program is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU General Public License for more details.
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You should have received a copy of the GNU General Public License along
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with this program; if not, write to the Free Software Foundation, Inc.,
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51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA.
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See the full license in the file "LICENSE" in the top level distribution directory
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*************************************************************************************/
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/* END LEGAL */
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#ifndef GRID_LOCAL_COHERENCE_IRL_H
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#define GRID_LOCAL_COHERENCE_IRL_H
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NAMESPACE_BEGIN(Grid);
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struct LanczosParams : Serializable {
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public:
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GRID_SERIALIZABLE_CLASS_MEMBERS(LanczosParams,
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ChebyParams, Cheby,/*Chebyshev*/
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int, Nstop, /*Vecs in Lanczos must converge Nstop < Nk < Nm*/
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int, Nk, /*Vecs in Lanczos seek converge*/
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int, Nm, /*Total vecs in Lanczos include restart*/
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RealD, resid, /*residual*/
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int, MaxIt,
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RealD, betastp, /* ? */
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int, MinRes); // Must restart
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};
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struct LocalCoherenceLanczosParams : Serializable {
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public:
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GRID_SERIALIZABLE_CLASS_MEMBERS(LocalCoherenceLanczosParams,
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bool, doFine,
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bool, doFineRead,
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bool, doCoarse,
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bool, doCoarseRead,
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LanczosParams, FineParams,
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LanczosParams, CoarseParams,
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ChebyParams, Smoother,
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RealD , coarse_relax_tol,
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std::vector<int>, blockSize,
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std::string, config,
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std::vector < std::complex<double> >, omega,
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RealD, mass,
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RealD, M5);
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};
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// Duplicate functionality; ProjectedFunctionHermOp could be used with the trivial function
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template<class Fobj,class CComplex,int nbasis>
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class ProjectedHermOp : public LinearFunction<Lattice<iVector<CComplex,nbasis > > > {
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public:
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typedef iVector<CComplex,nbasis > CoarseSiteVector;
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typedef Lattice<CoarseSiteVector> CoarseField;
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typedef Lattice<CComplex> CoarseScalar; // used for inner products on fine field
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typedef Lattice<Fobj> FineField;
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LinearOperatorBase<FineField> &_Linop;
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Aggregation<Fobj,CComplex,nbasis> &_Aggregate;
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ProjectedHermOp(LinearOperatorBase<FineField>& linop, Aggregation<Fobj,CComplex,nbasis> &aggregate) :
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_Linop(linop),
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_Aggregate(aggregate) { };
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void operator()(const CoarseField& in, CoarseField& out) {
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GridBase *FineGrid = _Aggregate.FineGrid;
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FineField fin(FineGrid);
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FineField fout(FineGrid);
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_Aggregate.PromoteFromSubspace(in,fin); std::cout<<GridLogIRL<<"ProjectedHermop : Promote to fine"<<std::endl;
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_Linop.HermOp(fin,fout); std::cout<<GridLogIRL<<"ProjectedHermop : HermOp (fine) "<<std::endl;
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_Aggregate.ProjectToSubspace(out,fout); std::cout<<GridLogIRL<<"ProjectedHermop : Project to coarse "<<std::endl;
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}
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};
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template<class Fobj,class CComplex,int nbasis>
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class ProjectedFunctionHermOp : public LinearFunction<Lattice<iVector<CComplex,nbasis > > > {
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public:
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typedef iVector<CComplex,nbasis > CoarseSiteVector;
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typedef Lattice<CoarseSiteVector> CoarseField;
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typedef Lattice<CComplex> CoarseScalar; // used for inner products on fine field
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typedef Lattice<Fobj> FineField;
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OperatorFunction<FineField> & _poly;
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LinearOperatorBase<FineField> &_Linop;
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Aggregation<Fobj,CComplex,nbasis> &_Aggregate;
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ProjectedFunctionHermOp(OperatorFunction<FineField> & poly,LinearOperatorBase<FineField>& linop,
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Aggregation<Fobj,CComplex,nbasis> &aggregate) :
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_poly(poly),
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_Linop(linop),
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_Aggregate(aggregate) { };
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void operator()(const CoarseField& in, CoarseField& out) {
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GridBase *FineGrid = _Aggregate.FineGrid;
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FineField fin(FineGrid) ;fin.checkerboard =_Aggregate.checkerboard;
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FineField fout(FineGrid);fout.checkerboard =_Aggregate.checkerboard;
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_Aggregate.PromoteFromSubspace(in,fin); std::cout<<GridLogIRL<<"ProjectedFunctionHermop : Promote to fine"<<std::endl;
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_poly(_Linop,fin,fout); std::cout<<GridLogIRL<<"ProjectedFunctionHermop : Poly "<<std::endl;
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_Aggregate.ProjectToSubspace(out,fout); std::cout<<GridLogIRL<<"ProjectedFunctionHermop : Project to coarse "<<std::endl;
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}
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};
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template<class Fobj,class CComplex,int nbasis>
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class ImplicitlyRestartedLanczosSmoothedTester : public ImplicitlyRestartedLanczosTester<Lattice<iVector<CComplex,nbasis > > >
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{
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public:
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typedef iVector<CComplex,nbasis > CoarseSiteVector;
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typedef Lattice<CoarseSiteVector> CoarseField;
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typedef Lattice<CComplex> CoarseScalar; // used for inner products on fine field
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typedef Lattice<Fobj> FineField;
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LinearFunction<CoarseField> & _Poly;
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OperatorFunction<FineField> & _smoother;
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LinearOperatorBase<FineField> &_Linop;
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Aggregation<Fobj,CComplex,nbasis> &_Aggregate;
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RealD _coarse_relax_tol;
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ImplicitlyRestartedLanczosSmoothedTester(LinearFunction<CoarseField> &Poly,
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OperatorFunction<FineField> &smoother,
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LinearOperatorBase<FineField> &Linop,
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Aggregation<Fobj,CComplex,nbasis> &Aggregate,
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RealD coarse_relax_tol=5.0e3)
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: _smoother(smoother), _Linop(Linop),_Aggregate(Aggregate), _Poly(Poly), _coarse_relax_tol(coarse_relax_tol) { };
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int TestConvergence(int j,RealD eresid,CoarseField &B, RealD &eval,RealD evalMaxApprox)
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{
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CoarseField v(B);
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RealD eval_poly = eval;
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// Apply operator
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_Poly(B,v);
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RealD vnum = real(innerProduct(B,v)); // HermOp.
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RealD vden = norm2(B);
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RealD vv0 = norm2(v);
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eval = vnum/vden;
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v -= eval*B;
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RealD vv = norm2(v) / ::pow(evalMaxApprox,2.0);
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std::cout.precision(13);
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std::cout<<GridLogIRL << "[" << std::setw(3)<<j<<"] "
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<<"eval = "<<std::setw(25)<< eval << " (" << eval_poly << ")"
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<<" |H B[i] - eval[i]B[i]|^2 / evalMaxApprox^2 " << std::setw(25) << vv
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<<std::endl;
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int conv=0;
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if( (vv<eresid*eresid) ) conv = 1;
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return conv;
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}
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int ReconstructEval(int j,RealD eresid,CoarseField &B, RealD &eval,RealD evalMaxApprox)
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{
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GridBase *FineGrid = _Aggregate.FineGrid;
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int checkerboard = _Aggregate.checkerboard;
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FineField fB(FineGrid);fB.checkerboard =checkerboard;
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FineField fv(FineGrid);fv.checkerboard =checkerboard;
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_Aggregate.PromoteFromSubspace(B,fv);
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_smoother(_Linop,fv,fB);
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RealD eval_poly = eval;
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_Linop.HermOp(fB,fv);
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RealD vnum = real(innerProduct(fB,fv)); // HermOp.
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RealD vden = norm2(fB);
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RealD vv0 = norm2(fv);
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eval = vnum/vden;
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fv -= eval*fB;
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RealD vv = norm2(fv) / ::pow(evalMaxApprox,2.0);
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std::cout.precision(13);
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std::cout<<GridLogIRL << "[" << std::setw(3)<<j<<"] "
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<<"eval = "<<std::setw(25)<< eval << " (" << eval_poly << ")"
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<<" |H B[i] - eval[i]B[i]|^2 / evalMaxApprox^2 " << std::setw(25) << vv
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<<std::endl;
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if ( j > nbasis ) eresid = eresid*_coarse_relax_tol;
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if( (vv<eresid*eresid) ) return 1;
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return 0;
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}
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};
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////////////////////////////////////////////
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// Make serializable Lanczos params
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////////////////////////////////////////////
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template<class Fobj,class CComplex,int nbasis>
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class LocalCoherenceLanczos
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{
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public:
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typedef iVector<CComplex,nbasis > CoarseSiteVector;
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typedef Lattice<CComplex> CoarseScalar; // used for inner products on fine field
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typedef Lattice<CoarseSiteVector> CoarseField;
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typedef Lattice<Fobj> FineField;
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protected:
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GridBase *_CoarseGrid;
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GridBase *_FineGrid;
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int _checkerboard;
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LinearOperatorBase<FineField> & _FineOp;
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// FIXME replace Aggregation with vector of fine; the code reuse is too small for
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// the hassle and complexity of cross coupling.
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Aggregation<Fobj,CComplex,nbasis> _Aggregate;
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std::vector<RealD> evals_fine;
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std::vector<RealD> evals_coarse;
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std::vector<CoarseField> evec_coarse;
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public:
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LocalCoherenceLanczos(GridBase *FineGrid,
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GridBase *CoarseGrid,
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LinearOperatorBase<FineField> &FineOp,
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int checkerboard) :
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_CoarseGrid(CoarseGrid),
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_FineGrid(FineGrid),
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_Aggregate(CoarseGrid,FineGrid,checkerboard),
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_FineOp(FineOp),
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_checkerboard(checkerboard)
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{
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evals_fine.resize(0);
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evals_coarse.resize(0);
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};
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void Orthogonalise(void ) { _Aggregate.Orthogonalise(); }
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template<typename T> static RealD normalise(T& v)
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{
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RealD nn = norm2(v);
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nn = ::sqrt(nn);
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v = v * (1.0/nn);
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return nn;
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}
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void fakeFine(void)
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{
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int Nk = nbasis;
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_Aggregate.subspace.resize(Nk,_FineGrid);
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_Aggregate.subspace[0]=1.0;
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_Aggregate.subspace[0].checkerboard=_checkerboard;
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normalise(_Aggregate.subspace[0]);
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PlainHermOp<FineField> Op(_FineOp);
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for(int k=1;k<Nk;k++){
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_Aggregate.subspace[k].checkerboard=_checkerboard;
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Op(_Aggregate.subspace[k-1],_Aggregate.subspace[k]);
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normalise(_Aggregate.subspace[k]);
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}
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}
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void testFine(RealD resid)
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{
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assert(evals_fine.size() == nbasis);
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assert(_Aggregate.subspace.size() == nbasis);
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PlainHermOp<FineField> Op(_FineOp);
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ImplicitlyRestartedLanczosHermOpTester<FineField> SimpleTester(Op);
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for(int k=0;k<nbasis;k++){
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assert(SimpleTester.ReconstructEval(k,resid,_Aggregate.subspace[k],evals_fine[k],1.0)==1);
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}
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}
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void testCoarse(RealD resid,ChebyParams cheby_smooth,RealD relax)
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{
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assert(evals_fine.size() == nbasis);
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assert(_Aggregate.subspace.size() == nbasis);
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//////////////////////////////////////////////////////////////////////////////////////////////////
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// create a smoother and see if we can get a cheap convergence test and smooth inside the IRL
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//////////////////////////////////////////////////////////////////////////////////////////////////
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Chebyshev<FineField> ChebySmooth(cheby_smooth);
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ProjectedFunctionHermOp<Fobj,CComplex,nbasis> ChebyOp (ChebySmooth,_FineOp,_Aggregate);
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ImplicitlyRestartedLanczosSmoothedTester<Fobj,CComplex,nbasis> ChebySmoothTester(ChebyOp,ChebySmooth,_FineOp,_Aggregate,relax);
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for(int k=0;k<evec_coarse.size();k++){
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if ( k < nbasis ) {
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assert(ChebySmoothTester.ReconstructEval(k,resid,evec_coarse[k],evals_coarse[k],1.0)==1);
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} else {
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assert(ChebySmoothTester.ReconstructEval(k,resid*relax,evec_coarse[k],evals_coarse[k],1.0)==1);
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}
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}
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}
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void calcFine(ChebyParams cheby_parms,int Nstop,int Nk,int Nm,RealD resid,
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RealD MaxIt, RealD betastp, int MinRes)
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{
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assert(nbasis<=Nm);
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Chebyshev<FineField> Cheby(cheby_parms);
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FunctionHermOp<FineField> ChebyOp(Cheby,_FineOp);
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PlainHermOp<FineField> Op(_FineOp);
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evals_fine.resize(Nm);
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_Aggregate.subspace.resize(Nm,_FineGrid);
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ImplicitlyRestartedLanczos<FineField> IRL(ChebyOp,Op,Nstop,Nk,Nm,resid,MaxIt,betastp,MinRes);
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FineField src(_FineGrid); src=1.0; src.checkerboard = _checkerboard;
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int Nconv;
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IRL.calc(evals_fine,_Aggregate.subspace,src,Nconv,false);
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// Shrink down to number saved
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assert(Nstop>=nbasis);
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assert(Nconv>=nbasis);
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evals_fine.resize(nbasis);
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_Aggregate.subspace.resize(nbasis,_FineGrid);
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}
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void calcCoarse(ChebyParams cheby_op,ChebyParams cheby_smooth,RealD relax,
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int Nstop, int Nk, int Nm,RealD resid,
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RealD MaxIt, RealD betastp, int MinRes)
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{
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Chebyshev<FineField> Cheby(cheby_op);
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ProjectedHermOp<Fobj,CComplex,nbasis> Op(_FineOp,_Aggregate);
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ProjectedFunctionHermOp<Fobj,CComplex,nbasis> ChebyOp (Cheby,_FineOp,_Aggregate);
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//////////////////////////////////////////////////////////////////////////////////////////////////
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// create a smoother and see if we can get a cheap convergence test and smooth inside the IRL
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//////////////////////////////////////////////////////////////////////////////////////////////////
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Chebyshev<FineField> ChebySmooth(cheby_smooth);
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ImplicitlyRestartedLanczosSmoothedTester<Fobj,CComplex,nbasis> ChebySmoothTester(ChebyOp,ChebySmooth,_FineOp,_Aggregate,relax);
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evals_coarse.resize(Nm);
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evec_coarse.resize(Nm,_CoarseGrid);
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CoarseField src(_CoarseGrid); src=1.0;
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ImplicitlyRestartedLanczos<CoarseField> IRL(ChebyOp,ChebyOp,ChebySmoothTester,Nstop,Nk,Nm,resid,MaxIt,betastp,MinRes);
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int Nconv=0;
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IRL.calc(evals_coarse,evec_coarse,src,Nconv,false);
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assert(Nconv>=Nstop);
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evals_coarse.resize(Nstop);
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evec_coarse.resize (Nstop,_CoarseGrid);
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for (int i=0;i<Nstop;i++){
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std::cout << i << " Coarse eval = " << evals_coarse[i] << std::endl;
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}
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}
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};
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NAMESPACE_END(Grid);
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#endif
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